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They could, depending on the values of a, b, x and y: they will if and only if a+x < 0 and b+y < 0
The coordinates of point B can be calculated using the midpoint formula. The midpoint formula is used to find the midpoint of two points, and is calculated by taking the average of the x-coordinates and the average of the y-coordinates. In this case, we are given the midpoint of AB, which is (-2, -4). We also know the coordinates of point A, which are (-3, -5). Using the midpoint formula, we can calculate the x-coordinate of point B by taking the average of the x-coordinates of points A and M. This is (-3 + -2)/2 = -2.5. We can calculate the y-coordinate of point B in a similar way. This is (-5 + -4)/2 = -4.5. Therefore, the coordinates of point B are (-2.5, -4.5).
the midpoint of
If you mean end point A is (3, 5) and midpoint of line AB is (-2, 8) then end point B is (-7, 11)
To construct the midpoint of a given line, use a compass to draw arcs on both ends of the line that intersect the line. Next, use a straight edge to draw a line connecting the two intersection points of the arcs. This line will pass through the midpoint of the original line.
It is: (9+5)/2 and (8+2)/2 which is 7 and 5 Midpoint: (7, 5)
Yes, they could. If x+a < 0 and y+b <0.
If you mean points of (-1, 5) and (6, -3) then the midpoint is (2.5, 1)
Find the midpoint of the two diagonals
If M is the midpoint of segment AB, then AMis congruent to MB.
16cm
Definition of midpoint: a point, line, or plane that bisects a line so that AB=BC Midpoint theorem: a point, or plane that bisects a line so that line AB is congruent to line BC. A-----------------------------------------------B----------------------------------------------------C The definition of midpoint refers to equality, while midpoint theorem refers to congruency.
You have points A, B, and C. Using a compass and straight edge, find a perpendicular bisector of AB (that is, a line that is perpendicular to AB and intersects AB at the midpoint of AB. Next, find a perpendicular bisector of BC. The two lines you found will meet at the center of the circle.
the midpoint of AB.
The coordinates of point B can be calculated using the midpoint formula. The midpoint formula is used to find the midpoint of two points, and is calculated by taking the average of the x-coordinates and the average of the y-coordinates. In this case, we are given the midpoint of AB, which is (-2, -4). We also know the coordinates of point A, which are (-3, -5). Using the midpoint formula, we can calculate the x-coordinate of point B by taking the average of the x-coordinates of points A and M. This is (-3 + -2)/2 = -2.5. We can calculate the y-coordinate of point B in a similar way. This is (-5 + -4)/2 = -4.5. Therefore, the coordinates of point B are (-2.5, -4.5).
The perpendicular bisector of a line segment AB is the straight line perpendicular to AB through the midpoint of AB.
the midpoint of
mdpt: point line or plane that bisects a line so that AB=BC. mdpt theorem: point or plane that bisects a line so that AB is congruent to BC.